On the non-existence of almost complex structures on sphere bundles over complex projective spaces

Abstract

We study the existence of almost complex structures on even-dimensional sphere bundles over complex projective spaces. For bundles n,q with fibre S2q over C Pn, we establish a necessary condition: if q a(n) for an explicit function, then the total space En,q does not admit an almost complex structure. As an application, we analyse a concrete family associated with the canonical line bundle and obtain non-existence criteria in terms of p-adic valuations; for p=2 this yields a simple numerical bound. The proofs rely on Chern class computations and divisibility properties of characteristic classes. The results leave open the question of existence in the range 4 q < a(n).